English

Improved bounds for centered colorings

Combinatorics 2021-08-13 v3

Abstract

A vertex coloring ϕ\phi of a graph GG is pp-centered if for every connected subgraph HH of GG either ϕ\phi uses more than pp colors on HH or there is a color that appears exactly once on HH. Centered colorings form one of the families of parameters that allow to capture notions of sparsity of graphs: A class of graphs has bounded expansion if and only if there is a function ff such that for every p1p\geq1, every graph in the class admits a pp-centered coloring using at most f(p)f(p) colors. In this paper, we give upper bounds for the maximum number of colors needed in a pp-centered coloring of graphs from several widely studied graph classes. We show that: (1) planar graphs admit pp-centered colorings with O(p3logp)\mathcal{O}(p^3\log p) colors where the previous bound was O(p19)\mathcal{O}(p^{19}); (2) bounded degree graphs admit pp-centered colorings with O(p)\mathcal{O}(p) colors while it was conjectured that they may require exponential number of colors in pp; (3) graphs avoiding a fixed graph as a topological minor admit pp-centered colorings with a polynomial in pp number of colors. All these upper bounds imply polynomial algorithms for computing the colorings. Prior to this work there were no non-trivial lower bounds known. We show that: (4) there are graphs of treewidth tt that require (p+tt)\binom{p+t}{t} colors in any pp-centered coloring and this bound matches the upper bound; (5) there are planar graphs that require Ω(p2logp)\Omega(p^2\log p) colors in any pp-centered coloring.

Keywords

Cite

@article{arxiv.1907.04586,
  title  = {Improved bounds for centered colorings},
  author = {Michał Dębski and Stefan Felsner and Piotr Micek and Felix Schröder},
  journal= {arXiv preprint arXiv:1907.04586},
  year   = {2021}
}
R2 v1 2026-06-23T10:17:12.661Z